Galois groups of large fields with simple theory (with an appendix by Philip Dittmann)

Abstract

Suppose that K is an infinite field which is large (in the sense of Pop) and whose first order theory is simple. We show that K is bounded, namely has only finitely many separable extensions of any given finite degree. We also show that any genus 0 curve over K has a K-point and if K is additionally perfect then K has trivial Brauer group. These results give evidence towards the conjecture that large simple fields are bounded PAC. Combining our results with a theorem of Lubotzky and van den Dries we show that there is a bounded PAC field L with the same absolute Galois group as K. In the appendix we show that if K is large and NSOP∞ and v is a non-trivial valuation on K then (K,v) has separably closed Henselization, so in particular the residue field of (K,v) is algebraically closed and the value group is divisible. The appendix also shows that formally real and formally p-adic fields are SOP∞ (without assuming largeness).